The weak specification property for geodesic flows on \(\mathrm{CAT}(-1)\) spaces (Q2180205)
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| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The weak specification property for geodesic flows on \(\mathrm{CAT}(-1)\) spaces |
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The weak specification property for geodesic flows on \(\mathrm{CAT}(-1)\) spaces (English)
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13 May 2020
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Summary: We prove that the geodesic flow on a compact locally \(\mathrm{CAT}(-1)\) space has the weak specification property, and give various applications. We show that every Hölder potential on the space of geodesics has a unique equilibrium state. We establish the equidistribution of weighted periodic orbits and the large deviations principle for all such measures. The thermodynamic results are proved for the class of expansive flows with weak specification.
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\(\mathrm{CAT}(-1)\) space
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geodesic flow
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weak specification property
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equilibrium measure
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Gibbs property
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measure of maximal entropy
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large deviations property
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